A rigorous approach to the field recursion method for two-component composites with isotropic phases
Abstract
In this chapter of the book entitled, "Extending the Theory of Composites to Other Areas of Science" [edited by Graeme W. Milton, 2016] we give a rigorous derivation of the field equation recursion method in the abstract theory of composites to two-component composites with isotropic phases. This method is of great interest since it has proven to be a powerful tool in developing sharp bounds for the effective tensor of a composite material. The reason is that the effective tensor can be interpreted in the general framework of the abstract theory of composites as the -operator on a certain orthogonal subspace collection. The base case of the recursion starts with an orthogonal subspace collection on a Hilbert space , the -problem, and the associated -problem. We provide some new conditions for the solvability of both the -problem and the associated -problem. We also give explicit representations of the associated -operator and -operator and study their analytical properties. An iteration method is then developed from a hierarchy of subspace collections and their associated operators which leads to a continued fraction representation of the initial effective tensor .
Cite
@article{arxiv.1601.01378,
title = {A rigorous approach to the field recursion method for two-component composites with isotropic phases},
author = {Maxence Cassier and Aaron Welters and Graeme W. Milton},
journal= {arXiv preprint arXiv:1601.01378},
year = {2016}
}
Comments
27 pages; this is a copy of chapter 10 in the book "Extending the Theory of Composites to Other Areas of Science" edited by Graeme W. Milton, 2016, Milton-Patton Publishers, ISBN: 978-1-4835-6919-2